An $\ell _{1}$ -Laplace Robust Kalman Smoother

Robustness is a major problem in Kalman filtering and smoothing that can be solved using heavy tailed distributions; e.g., ℓ₁-Laplace. This paper describes an algorithm for finding the maximum a posteriori (MAP) estimate of the Kalman smoother for a nonlinear model with Gaussian process noise and ℓ₁ -Laplace observation noise. The algorithm uses the convex composite extension of the Gauss-Newton method. This yields convex programming subproblems to which an interior point path-following method is applied. The number of arithmetic operations required by the algorithm grows linearly with the number of time points because the algorithm preserves the underlying block tridiagonal structure of the Kalman smoother problem. Excellent fits are obtained with and without outliers, even though the outliers are simulated from distributions that are not ℓ₁ -Laplace. It is also tested on actual data with a nonlinear measurement model for an underwater tracking experiment. The ℓ₁-Laplace smoother is able to construct a smoothed fit, without data removal, from data with very large outliers.